6533b870fe1ef96bd12cfcb6
RESEARCH PRODUCT
Inverse square root level-crossing quantum two-state model
Aram PapoyanT. A. IshkhanyanT. A. IshkhanyanArtur IshkhanyanClaude Leroysubject
Quantum PhysicsPure mathematicsPhysics and Astronomy (miscellaneous)Mathematics::Classical Analysis and ODEsFOS: Physical sciencesField (mathematics)Function (mathematics)Optical fieldLevel crossing01 natural sciencesFast inverse square root010309 optics0103 physical sciencesQuantum systemQuantum Physics (quant-ph)010306 general physicsInstrumentationQuantumMathematicsPhysical quantitydescription
We introduce a new unconditionally solvable level-crossing two-state model given by a constant-amplitude optical field configuration for which the detuning is an inverse-square-root function of time. This is a member of one of the five families of bi-confluent Heun models. We prove that this is the only non-classical exactly solvable field configuration among the bi-confluent Heun classes, solvable in terms of finite sums of the Hermite functions. The general solution of the two-state problem for this model is written in terms of four Hermite functions of a shifted and scaled argument (each of the two fundamental solutions presents an irreducible combination of two Hermite functions). We present the general solution, rewrite it in terms of more familiar physical quantities and analyze the time dynamics of a quantum system subject to excitation by a laser field of this configuration.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2020-09-01 | Laser Physics Letters |